题目内容
如图a所示,在直角梯形ABCD中,AB⊥AD,AD∥BC,F为AD的中点,E在BC上,且EF∥AB.已知AB=AD=CE=2,沿线段EF把四边形CDEF折起如图b所示,使平面CDEF⊥平面ABEF.
(1)求证:AF⊥平面CDEF;
(2)求三棱锥C-ADE的体积;
(3)求二面角B-AC-D的余弦值.
(1)求证:AF⊥平面CDEF;
(2)求三棱锥C-ADE的体积;
(3)求二面角B-AC-D的余弦值.
(1)证明:∵平面CDFE⊥平面ABEF,且平面CDFE∩平面ABEF=EF,AF⊥FE,AF?平面ABEF,
∴AF⊥平面CDEF;
(2)由(1)知,AF为三棱锥A-CDE的高,且AF=1,
又∵AB=CE=2,∴S△CDE=
×2×2=2,
故三棱锥C-ADE体积V=
AF•S△CDE=
;
(3)由题意,AD=
,CD=
,BC=
,AB=2,AC=3
∴S△ABC=
AB•BC=
∵cos∠DCA=
=
=
∴sin∠DCA=
∴S△ADC=
DC•ACsin∠DCA=
•
•3•
=
∴二面角B-AC-D的余弦值为
=
=
.
∴AF⊥平面CDEF;
(2)由(1)知,AF为三棱锥A-CDE的高,且AF=1,
又∵AB=CE=2,∴S△CDE=
| 1 |
| 2 |
故三棱锥C-ADE体积V=
| 1 |
| 3 |
| 2 |
| 3 |
(3)由题意,AD=
| 2 |
| 5 |
| 5 |
∴S△ABC=
| 1 |
| 2 |
| 5 |
∵cos∠DCA=
| DC2+AC2-AD2 |
| 2DC•AC |
| 5+9-2 | ||
2
|
| 2 | ||
|
∴sin∠DCA=
| 1 | ||
|
∴S△ADC=
| 1 |
| 2 |
| 1 |
| 2 |
| 5 |
| 1 | ||
|
| 3 |
| 2 |
∴二面角B-AC-D的余弦值为
| S△ADC |
| S△ABC |
| ||
|
3
| ||
| 10 |
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如图a所示,在直角梯形ABCD中,AB⊥AD,AD∥BC,F为AD的中点,E在BC上,且EF∥AB.已知AB=AD=CE=2,沿线段EF把四边形CDEF折起如图b所示,使平面CDEF⊥平面ABEF.
如图a所示,在直角梯形ABCD中,AB⊥AD,AD∥BC,F为AD的中点,E在BC上,且EF∥AB.已知AB=AD=CE=2,沿线段EF把四边形CDEF折起如图b所示,使平面CDEF⊥平面ABEF.